On the connection between the Nekhoroshev theorem and Arnold Diffusion

Abstract

The analytical techniques of the Nekhoroshev theorem are used to provide estimates on the coefficient of Arnold diffusion along a particular resonance in the Hamiltonian model of Froeschl\'e et al. (2000). A resonant normal form is constructed by a computer program and the size of its remainder ||Ropt|| at the optimal order of normalization is calculated as a function of the small parameter ε. We find that the diffusion coefficient scales as D||Ropt||3, while the size of the optimal remainder scales as ||Ropt|| (1/ε0.21) in the range 10-4≤ε ≤ 10-2. A comparison is made with the numerical results of Lega et al. (2003) in the same model.